An arbitrary Lagrangian-Eulerian formulation of a geometrically exact Timoshenko beam running through a tube
From MaRDI portal
Publication:1790267
DOI10.1007/s00707-018-2161-zzbMath1396.74082OpenAlexW2801172453MaRDI QIDQ1790267
Jia-Peng Liu, Zai-Bin Cheng, Ge-Xue Ren
Publication date: 2 October 2018
Published in: Acta Mechanica (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s00707-018-2161-z
Related Items (7)
Equivalence of Lagrange's equations for non-material volume and the principle of virtual work in ALE formulation ⋮ A free‐interface component mode synthesis of moving contact multibodies and its application to gear contacts ⋮ Non‐material finite element rod model for the lateral run‐off in a two‐pulley belt drive ⋮ Review and perspectives in applied mechanics of axially moving flexible structures ⋮ A model order reduction method for the simulation of gear contacts based on arbitrary Lagrangian Eulerian formulation ⋮ A highly efficient beam-in-beam large sliding contact method for flexible multibody dynamics ⋮ Numerical simulation of weakly compressible hyper-elastic solids using a conservative pressure-velocity formulation on arbitrary Lagrangian-Eulerian framework
Uses Software
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- An approach to directional drilling simulation: finite element and finite segment methods with contact
- Review and comparison of dry friction force models
- A Lagrange-Eulerian formulation of an axially moving beam based on the absolute nodal coordinate formulation
- A modeling of sliding joint on one-dimensional flexible medium
- The nonlinear dynamics of elastic rods
- A three-dimensional finite-strain rod model. II. Computational aspects
- On the dynamics in space of rods undergoing large motions - A geometrically exact approach
- On finite deformations of space-curved beams
- Stability analysis for systems of nonlinear Hill's equations
- Nonlinear model of an axially moving plate in a mixed Eulerian-Lagrangian framework
- Geometrically exact 3D beam theory: Implementation of a strain-invariant finite element for statics and dynamics
- Effects of deformation in the dynamics of belt drive
- Nonlinear Mechanics of Thin-Walled Structures
- Solving Ordinary Differential Equations I
- On the Dynamics of Flexible Beams Under Large Overall Motions—The Plane Case: Part II
- A beam finite element non-linear theory with finite rotations
- Large displacement analysis of three-dimensional beam structures
- Parametrization of finite rotations in computational dynamics: a review
- Interpolation of rotational variables in nonlinear dynamics of 3D beams
- Objectivity of strain measures in the geometrically exact three-dimensional beam theory and its finite-element implementation
- The Stability of the Equilibrium of a Nonlinear Hill’s Equation
- Mixed Eulerian–Lagrangian description in materials processing: deformation of a metal sheet in a rolling mill
- Computational aspects of vector‐like parametrization of three‐dimensional finite rotations
- A rational treatment of the relations of balance for mechanical systems with a time-variable mass and other non-classical supplies
- Systems with mass explicitly dependent on position
- Nonlinear problems of elasticity
This page was built for publication: An arbitrary Lagrangian-Eulerian formulation of a geometrically exact Timoshenko beam running through a tube
